The origin and development of the fundamental theorem of projective geometry . Recommendation concurred in: Committee on Final Examination UlUC TABLE OF CONTEHT3. 1(1 >|(:|( % % % ;f i|i Chapter page Introduction 1 I. The Origin of the Fundamental TheoreK 2 II. Karl G, Chr. von Staudts Proof 5 III. Theodore Reyes Proof 12 IV. Karl Weierstrass Proof 15 V. A Proof Based upon Motion in a Plane 17a VI. A Pi*oof Based upon the Analytic Plane 21 VII, Historic Sketch of the Continuity Idea 26 VIII. Comparative Study of the Various Proofs 27 IZ. Plates 30 ^13949 Digitized by the Internet Archivein
The origin and development of the fundamental theorem of projective geometry . Recommendation concurred in: Committee on Final Examination UlUC TABLE OF CONTEHT3. 1(1 >|(:|( % % % ;f i|i Chapter page Introduction 1 I. The Origin of the Fundamental TheoreK 2 II. Karl G, Chr. von Staudts Proof 5 III. Theodore Reyes Proof 12 IV. Karl Weierstrass Proof 15 V. A Proof Based upon Motion in a Plane 17a VI. A Pi*oof Based upon the Analytic Plane 21 VII, Historic Sketch of the Continuity Idea 26 VIII. Comparative Study of the Various Proofs 27 IZ. Plates 30 ^13949 Digitized by the Internet Archivein 2013 1 THE 0 RIG in AND LKVKLOPJJEIIT OK THE KUUDAlEUTAL TEEOKJiA: OF PROJECTIVE Altho nary of the theoreiEs of Projective Geometry werekrown to the ancient geometers. Projective Geometry as an inde-pendent branch of Geometry is a product of the nineteenth Geometry m^y be defined as that branch of Geometrywhich deals only with quality and therefore treats as equivalent, whose dorigindevelopmen00farv
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Keywords: ., bookcentury1900, bookdecade1910, booksubjectgeometryprojective
